Abstract
An approach, based on the Smith Normal Form, is introduced to study the spectra of symmetric matrices with a given graph. The approach serves well to explain how the path cover number (resp. diameter of a tree T) is related to the maximal multiplicity MaxMult(T) occurring for an eigenvalue of a symmetric matrix whose graph is T (resp. the minimal number q(T) of distinct eigenvalues over the symmetric matrices whose graphs are T). The approach is also applied to a more general class of connected graphs G, not necessarily trees, in order to establish a lower bound on q(G). © 2008 Springer Science+Business Media, LLC.
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Kim, I. J., & Shader, B. L. (2009). Smith Normal Form and acyclic matrices. Journal of Algebraic Combinatorics, 29(1), 63–80. https://doi.org/10.1007/s10801-008-0121-8
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